Date: Apr 6, 2013 2:13 AM
Author: namducnguyen
Subject: Re: Matheology § 224
On 06/04/2013 12:08 AM, Virgil wrote:

> In article <bWN7t.281592$O52.191417@newsfe10.iad>,

> Nam Nguyen <namducnguyen@shaw.ca> wrote:

>

>> On 05/04/2013 10:31 PM, Virgil wrote:

>>> In article <VFM7t.356449$PC7.98356@newsfe03.iad>,

>>> Nam Nguyen <namducnguyen@shaw.ca> wrote:

>>>

>>>> Then you don't seem to understand the nature of cGC, depending on the

>>>> formulation of the Conjecture but being a _different_ formula.

>>>>

>>>> For GC (the Goldbach conjecture), there naturally are 2 cases:

>>>

>>> What if the GC is eventually proved true in all systems?

>>

>> What do you mean by "all" systems?

>

> At least all systems in which a set of positive naturals with the usual

> forms of addition and multiplication are possible.

What do you mean by "positive naturals", "usual forms", "possible"?

That's way too "intuitive" to conclude anything definitely, right?

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There is no remainder in the mathematics of infinity.

NYOGEN SENZAKI

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